Difference between revisions of "Differential Cross-Section"

From New IAC Wiki
Jump to navigation Jump to search
Line 5: Line 5:
  
  
<center><math>-i \mathfrak{M}_1=ie(\mathbf p_1+\mathbf p_2)^{\mu} \left (\frac{-ig_{\mu \nu}}{q^2} \right ) ie\mathbf (p_{1}^'+\mathbf p_2^')^{\nu}</math></center>
+
<center><math>-i \mathfrak{M}_1=ie(\mathbf p_1+\mathbf p_2)^{\mu} \left (\frac{-ig_{\mu \nu}}{q^2} \right ) ie \mathbf (p_{1}^'+\mathbf p_2^')^{\nu}</math></center>
  
  
<center><math>-i \mathfrak{M}_1=ie(\mathbf p_1+\mathbf p_2)^{\mu} \left (\frac{-ig_{\mu \nu}}{(\mathbf p_2^'-p_1^')^2} \right ) ie\mathbf (p_{1}^'+\mathbf p_2^')^{\nu}</math></center>
+
<center><math>-i \mathfrak{M}_1=ie(\mathbf p_1+\mathbf p_2)^{\mu} \left (\frac{-ig_{\mu \nu}}{(\mathbf p_2^'-p_1^')^2} \right ) ie \mathbf (p_{1}^'+\mathbf p_2^')^{\nu}</math></center>
  
  
  
<center><math>-i \mathfrak{M}_1=ie^2\left (\frac{(\mathbf p_1+\mathbf p_2)_{\mu}(\mathbf (p_{1}^'+\mathbf p_2^')^{\mu}}{(\mathbf p_2^'-p_1^')^2} \right ) </math></center>
+
<center><math>-i \mathfrak{M}_1=ie^2\left (\frac{(\mathbf p_1+\mathbf p_2)_{\mu}( (\mathbfp_{1}^'+\mathbf p_2^')^{\mu}}{(\mathbf p_2^'-p_1^')^2} \right ) </math></center>
  
  

Revision as of 16:08, 25 June 2017

Feynman1stLevel.png


[math]\mathfrak{M}=\mathfrak{M}_1+\mathfrak{M}_2[/math]


[math]-i \mathfrak{M}_1=ie(\mathbf p_1+\mathbf p_2)^{\mu} \left (\frac{-ig_{\mu \nu}}{q^2} \right ) ie \mathbf (p_{1}^'+\mathbf p_2^')^{\nu}[/math]


[math]-i \mathfrak{M}_1=ie(\mathbf p_1+\mathbf p_2)^{\mu} \left (\frac{-ig_{\mu \nu}}{(\mathbf p_2^'-p_1^')^2} \right ) ie \mathbf (p_{1}^'+\mathbf p_2^')^{\nu}[/math]


[math]-i \mathfrak{M}_1=ie^2\left (\frac{(\mathbf p_1+\mathbf p_2)_{\mu}( (\mathbfp_{1}^'+\mathbf p_2^')^{\mu}}{(\mathbf p_2^'-p_1^')^2} \right ) [/math]


[math]-i \mathfrak{M}_{e^-e^-}=-i \left ( \frac{e^2(\mathbf p_1^*+\mathbf p_{1}^{'*})_{\mu}(\mathbf p_2^*+\mathbf p_{2}^{'*})^{\mu}}{(\mathbf p_{2}^{'*}-\mathbf p_2^*)^2}- \frac{e^2(\mathbf p_1^*+\mathbf p_{2}^{'*})_{\mu}(\mathbf p_2^*+\mathbf p_{1}^{'*})^{\mu}}{(\mathbf p_{1}^{'*}-\mathbf p_2^*)^2} \right )[/math]


[math] \mathfrak{M}_{e^-e^-}= e^2\left ( \frac{\mathbf P_1^* \mathbf P_2^*+\mathbf P_{1}^{'*} \mathbf P_{2}^{'*}+\mathbf P_{1}^{'*} \mathbf P_2^*+\mathbf P_1^* \mathbf P_{2}^{'*}}{(\mathbf P_{2}^{'*}-\mathbf P_2^*)^2}- \frac{\mathbf P_1^* \mathbf P_2^*+\mathbf P_{2}^{'*} \mathbf P_{1}^{'*}+\mathbf P_{2}^{'*} \mathbf P_2^*+\mathbf P_1^* \mathbf P_{1}^*}{(\mathbf P_{1}^*-\mathbf P_2^*)^2} \right )[/math]


Using the fact that [math]\mathbf P_1^{'*} \mathbf P_2^{'*}=\mathbf P_1^* \mathbf P_2^* \quad \quad \mathbf P_1^{'*} \mathbf P_1^{*}=\mathbf P_2^{'*} \mathbf P_2^* \quad \quad \mathbf P_1^{*} \mathbf P_2^{'*}=\mathbf P_2^* \mathbf P_1^{'*}[/math]


[math] \mathfrak{M}_{e^-e^-}= e^2\left ( \frac{2\mathbf P_1^* \mathbf P_2^*+2\mathbf P_{1}^{'*} \mathbf P_2^*}{(\mathbf P_{2}^{'*2}-2\mathbf P_{2}^{'*}\mathbf P_2^{*}+\mathbf P_2^{*2})}- \frac{2\mathbf P_1^* \mathbf P_2^*+2\mathbf P_1^* \mathbf P_{1}^{'*}}{(\mathbf P_{1}^{'*2}-2\mathbf P_{1}^{'*}\mathbf P_2^{'*}+\mathbf P_2^{'*2})} \right )[/math]


[math] \mathfrak{M}_{e^-e^-}= e^2\left ( \frac{2\mathbf P_1^* \mathbf P_2^*+2\mathbf P_{1}^{'*} \mathbf P_2^*}{(\mathbf P_2^{*2}-2\mathbf P_2^{*}\mathbf P_{2}^{'*}+\mathbf P_{2}^{'*2})}- \frac{2\mathbf P_1^* \mathbf P_2^*+2\mathbf P_1^* \mathbf P_{1}^{'*}}{(\mathbf P_2^{'*2}-2\mathbf P_2^{'*}\mathbf P_{1}^{'*}+\mathbf P_{1}^{'*2})} \right )[/math]


[math] \mathfrak{M}_{e^-e^-}= e^2\left ( \frac{2\mathbf P_1^* \mathbf P_2^*+2\mathbf P_{1}^{'*} \mathbf P_2^*}{(\mathbf P_2^*-\mathbf P_{2}^{'*})^2}- \frac{2\mathbf P_1^* \mathbf P_2^*+2\mathbf P_1^* \mathbf P_{1}^{'*}}{(\mathbf P_2^{'*}-\mathbf P_{1}^{'*})^2} \right )[/math]



[math] \mathfrak{M}_{e^-e^-}= e^2\left ( \frac{ (\mathbf P_1^{*2}-2 \mathbf P_1^* \mathbf P_2^{'*}+ \mathbf P_2^{'*2})-(\mathbf P_1^{*2}+2 \mathbf P_1^* \mathbf P_2^*+ \mathbf P_2^{*2})}{t}- \frac{(\mathbf P_1^{*2}-2 \mathbf P_1^* \mathbf P_1^{'*}+ \mathbf P_1^{'*2})-( \mathbf P_1^{*2}+2 \mathbf P_1^* \mathbf P_2^*+ \mathbf P_2^{*2})}{u} \right )[/math]


[math]\mathfrak{M}_{e^-e^-}=e^2 \left (\frac{u-s}{t}+\frac{t-s}{u} \right )[/math]